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Transcript
1
Hands-On Activity: Measuring Planck’s constant with LEDs
Quantum Physics
The physics of the very small
with great applications
Part 3: HANDS-ON ACTIVITIES
Measuring Planck’s Constant with LEDs
TRANSLATED BY:
Quantum Spin-Off is funded by the European Union under the LLP Comenius programme
(540059-LLP-1-2013-1-BE-COMENIUS-CMP).
Renaat Frans, Laura Tamassia
Contact: [email protected]
www.quantumspinoff.eu
2
Hands-On Activity: Measuring Planck’s constant with LEDs
Measuring Planck’s constant using LEDs.
Introduction1
Max Planck (1858-1947) was a pioneer in the field of quantum mechanics.
Around 1900 he introduced the concept of quantized energy. He postulated
that an atom can only absorb and emit energy of certain specific values, given
by
𝐸 =𝑛∙ℎ∙𝑓
where n is natural number, f is the frequency and h is Planck’s constant.
In 1905 Einstein used the idea of quantized energy to explain the photo-electric effect. This is the
name given to the phenomenon of a metal emitting electrons when light of a specific wavelength is
shone on it. He assumed that each of the emitted electrons had absorbed a quantum of energy (called
a photon) whose energy is given by
𝐸 =ℎ∙𝑓 =
ℎ∙𝑐
𝜆
where f is the frequency of the light and  is its wavelength. For the electron to be able to free itself
from the metal, the energy of the photon needs to be sufficiently high, meaning at least equal to the
work done when leaving the metal in question.
Niels Bohr also used Planck’s idea as a basis for a new model of the atom. He assumed that electrons
could only move on specific orbits around the nucleus of an atom. When an electron goes from an
orbit which is further away from the nucleus to one which is closer to it, it emits light made up of
photons whose energy is equal to the energy difference of the orbits.
Δ𝐸 = ℎ ∙ 𝑓 =
ℎ∙𝑐
𝜆
Ever since Max Planck postulated the quantization of the energy, there have been many experiments
which tried to determine Planck’s constant and corroborate his idea. The current value of Planck’s
constant is
ℎ = 6,6260693 ∙ 10−34 𝐽𝑠 = 4,13566743 ∙ 10−15 𝑒𝑉𝑠
In this experiment you will use LEDs to determine Planck’s constant.
1
This activity is partially based on the “bridge project” of the University of Antwerp, department of Physics (Prof.
dr. J. Dirckx, W. Peeters)
www.quantumspinoff.eu
3
Hands-On Activity: Measuring Planck’s constant with LEDs
INTERNAL STRUCTURE OF A LED
A LED is made up of two types of semiconductor: p-type and n-type. The ntype has a surplus of free electrons, and the p-type has a surplus of holes.
On the boundary where both types of semiconductors meet, the free
electrons of the n-type recombine with the holes of the p-type which
creates a so-called depletion zone. This zone is negatively charged on the
p-type side and positively charged on the n-type side. The recombination
causes an electric field on the boundary between the two semiconductors.
The electric field in its turn inhibits the movement of free electrons
through the depletion zone.
If the LED is connected to a voltage source such that its positive side is attached to the p-type
semiconductor and its negative side to the n-type semiconductor AND the voltage is taken sufficiently
high to give the electrons enough energy to overcome the electric field in the depletion zone, then
electrons can flow from the n-type to the p-type material. There they can recombine with holes.
electron current
Conduction band
Valence band
hole current
When recombining they go
from a higher energy level
(the conduction band) to a
lower energy level (the
valence band), and the energy
difference is emitted in the
form of light and the LED
turns on. The minimal
necessary voltage for this to
happen is called the threshold
voltage.
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4
Hands-On Activity: Measuring Planck’s constant with LEDs
The photon which is emitted when the electron recombines with a hole, has an energy 𝐸 = ℎ ∙ 𝑓. This
energy corresponds to what the electron received when the voltage source was turned on. During your
classes on electricity you learned that this energy is equal to
𝐸 = 𝑒 ∙ 𝑈0
where e is the charge of the electron (1,60 ∙ 10−19 𝐶) and U0 is the threshold voltage.
From this it follows that
𝑒 ∙ 𝑈0 = ℎ ∙ 𝑓
⇔
𝑒 ∙ 𝑈0 = ℎ ∙
𝑐
𝜆
If you can measure the threshold voltage at which the LED turns on and you measure the wavelength
of the emitted light, you now have a formula that you can use to determine Planck’s constant.
Experiment
Research question:
How can Planck’s constant be experimentally
determined?
DETERMINING PLANCK’S CONSTANT
EXPERIMENTALLY
Materials
-
4 colored LED-lights
Spectroscope
Source
Volt meter
LED-holder
Question 1:
AT WHAT ENERGY DO THE LEDS TURN ON?
Method
1.
2.
3.
4.
5.
6.
7.
8.
9.
Connect the source with the volt meter(see figure)
Place one of the LED-lights in the holder
Make sure the voltage of the source is 0
Connect the LED with the source
Hold the holder close to your eye
Slowly increase the voltage of the source until you clearly see the LED
glowing
Decrease the voltage until the LED turns off again
Increase the voltage until the LED turns on again
This is the threshold voltage necessary to let the electrons pass
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5
Hands-On Activity: Measuring Planck’s constant with LEDs
through the depletion zone. Write down the corresponding threshold voltage for each of the LEDs, and
calculate its corresponding energy.
Color LED
Voltage U0
(V)
Calculate E = U0.e
blue
green
yellow
red
Question 2:
WHAT IS THE WAVELENGTH OF THE LIGHT EMITTED BY THE LEDS?
Method
1.
2.
3.
4.
5.
6.
7.
8.
Place the lamp with the scale on one side of the
spectroscope.
Turn the source of this lamp on
Connect the LED with the source
Place one of the LEDs in the holder
Make sure the voltage of the source is 0
Place the LED-holder at the other side of the
spectroscope
Increase the voltage until the LED is on and try to
determine its position with respect to the scale.
Use the calibration curve to determine the wavelength
of light emitted by the LED from its position on the scale.
LED
Measurement
Wavelength: 
(nm)
blue
green
yellow
red
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6
Hands-On Activity: Measuring Planck’s constant with LEDs
Conclusion questions 1 & 2
We use the formula which was given in the introduction
ℎ=
with c = 3,0 ∙ 108
m
s
LED
𝐸 𝐸∙𝜆
=
𝑓
𝑐
QUESTION 1
E
(J)
QUESTION 2
𝜆
(m)
ℎ
(Js)
blue
green
yellow
red
Determine the average value for Planck’s constant
h = ___________________________________
Does this correspond to the theoretical value? Do you find the correct order of magnitude?
Conclusion & Reflection
____________________________________________________________________________________
________________________________________________________________________________
Bibliography
M.F. Crommie, C.P. Lutz, D.M. Eigler. Confinement of electrons to quantum corrals on a metal
surface.Science 262, 218-220 (1993).
www.quantumspinoff.eu